Manifold classification from the descriptive viewpoint
Abstract
We consider classification problems for manifolds and discrete subgroups of Lie groups from a descriptive set-theoretic point of view. This work is largely foundational in conception and character, recording both a framework for general study and Borel complexity computations for some of the most fundamental classes of manifolds. We show, for example, that for all , the homeomorphism problem for compact topological -manifolds is Borel equivalent to the relation of equality on the natural numbers, while the homeomorphism problem for noncompact topological -manifolds is of maximal complexity among equivalence relations classifiable by countable structures. A nontrivial step in the latter consists of proving Borel measurable formulations of the Jordan--Schoenflies and surface triangulation theorems. Turning our attention to groups and geometric structures, we show, strengthening results of Stuck--Zimmer and Andretta--Camerlo--Hjorth, that the conjugacy relation on discrete subgroups of any noncompact semisimple Lie group is essentially countable universal. So too, as a corollary, is the isometry relation for complete hyperbolic -manifolds for any , generalizing a result of Hjorth--Kechris. We then show that the isometry relation for complete hyperbolic -manifolds with finitely generated fundamental group is, in contrast, Borel equivalent to the equality relation on the real numbers when , but that it is not concretely classifiable when ; thus there exists no Borel assignment of numerical complete invariants to finitely generated Kleinian groups up to conjugacy. We close with a survey of the most immediate open questions.
Cite
@article{arxiv.2512.24996,
title = {Manifold classification from the descriptive viewpoint},
author = {Jeffrey Bergfalk and Iian B. Smythe},
journal= {arXiv preprint arXiv:2512.24996},
year = {2026}
}
Comments
A preliminary version; comments are very welcome